六阶图G与Sn的积图的交叉数

确定图的交叉数是NP．完全问题．目前已确定交叉数的六阶图与星图的笛卡尔积图极少。本文确定了—个六阶图G与星图5k积图的交叉数为Z（6,n）＋2n＋[n/2].     

五阶图与星图的笛卡尔积交叉数

In this paper, we compute the crossing number of a specific graph Hn, and then by contraction, we obtain the conclusion that cr（G13 × Sn） = 4[n/2] [n-1/2]＋[n/2] . The result fills up the blank of the crossing numbers of Cartesian products of stars with all 5-vertex graphs presented by Marian Klesc.     

完全二部图K_{3,3}与星S_n的积图的交叉数

确定图的交叉数是NP-完全问题. 目前有关完全二部图与星图的积图的交叉数结果并不多. 引入了一些新的收缩技巧, 建立了积图K_{3,3}\square S_n与完全三部图K_{3,3,n}之间的交叉数关系. 从而, 为进一步完全确定积图K_{3,3}\square S_n的交叉数提供了一条新途径.     

交叉数为2的笛卡尔积图

图G的交叉数,记作cr(G),是把G画在平面上的所有画法中边与边产生交叉的最小数目,它是拓扑图论中的一个热点问题。Kle?c和Petrillová刻画了当G₁为圈且cr(G₁G₂)-2时,因子图G₁和G₂满足的充要条件。在此基础上,本文研究当|V(G₁)|≥3且cr(G₁G₂)=2时,G₁和G₂应满足的充要条件。     

五阶图与路P_n的联图交叉数

利用Kleitman D J给出的完全二部图的的交叉数cr(_(5,n))=Z(5,n)的结果,分别得到了联图G_(12)∨P_n,G_(15)∨P_n,G_(18)∨P_n的交叉数.同时,给出了目前已知的所有五阶图与路的联图交叉数情况.     

W6*Sn的交叉数

早在20世纪50年代,Zarankiewicz 猜想完全2-部图K_{m,n}(m\leq n)的交叉数为\lfloor\frac{m}{2}\rfloor\times \lfloor\frac{m-1}{2}\rfloor\times\lfloor\frac{n}{2}\rfloor\times\lfloor\frac{n-1}{2}\rfloor (对任意实数x,\lfloor x\rfloor表示不超过x的最大整数). 目前这一猜想的正确性只证明了当m\leq6时成立. 假定著名的Zarankiewicz的猜想对m=7的情形成立,确定了6-轮W_{6}与星S_{n}的笛卡尔积图的交叉是 cr(W_{6}\times S_{n})=9\lfloor\frac{n}{2}\rfloor\times\lfloor\frac{n-1}{2}\rfloor+2n+5\lfloor\frac{n}{2}\rfloor.     

$W_m$与$P_n$ 的笛卡儿积图的交叉数

Most results on crossing numbers of graphs focus on some special graphs, such as the Cartesian products of small graphs with path, star and cycle. In this paper, we obtain the crossing number formula of Cartesian products of wheel Wm with path Pn, for arbitrary m ≥ 3 and n≥ 1.     

关于一个特殊六阶图与路和圈的联图的交叉数

Garey和Johnson证明了确定图的交叉数问题是一个NP-难问题.目前,已确定交叉数的图类并不多.本文证明了一个特殊6阶图与n个孤立点,路P_n及圈C_n的联图的交叉数分别是cr(Q+nK_1)=Z(6,n)+n;cr(Q+P_n)=Z(6,n)+n+1及cr(Q+C_n)=Z(6,n)+n+3.     

交叉数为2且因子图为路的笛卡尔积图

M.Kle??和J.Petrillová刻画了当G1为圈且cr (G1G2)=2时,因子图G1和G2所满足的充要条件.在此基础上,该文进一步刻画了在cr (G1G2)=2的前提下,当G1=P4,或者G1=P3且△(G2)=4时,因子图G2应满足的充要条件.     

一个六阶3-连通图与路Pn的笛卡尔积的交叉数

C(6,2)表示由圈C6增加边vivi 2(i=1,…,6,i 2(m od6))所得的图,把边vivi 2叫做C(6,2)的弦,B表示C(6,2)除去一条弦所得到的图,我们确定了B与Pn笛卡尔积的交叉数为5n-1.     

循环图C(10,2)与路P_n的笛卡尔积的交叉数

证明了循环图C(10,2)与路P_n的笛卡尔积的交叉数是10n及循环图C(2m,2)的一点悬挂和两点悬挂的交叉数分别是m,2m.     

The Crossing Number of Cartesian Products of Stars with 5-vertex Graphs II

The crossing number of cartesian products of paths and cycles with 5-vertex graphs mostly are known, but only few cartesian products of 5-vertex graphs with star K 1,n are known. In this paper, we will extent those results, and determine the crossing numbers of cartesian products of two 5-vertex graphs with star K 1,n .     

一个五阶图与路、圈的联图的交叉数

目前已经确定的两个图的联图的交叉数结果较少.设H是由一个4圈及一个孤立点所构成的5阶图.研究了图H与路、圈的联图的交叉数,得到了cr(H+P_n)=Z(5,n)+[n/2]+l,cr(H+C_n):Z(5,n)+[n/2]+2,其中,P_n与C_n分别表示含n个顶点的路与圈.     

On the Pseudolinear Crossing Number

A drawing of a graph is pseudolinear if there is a pseudoline arrangement such that each pseudoline contains exactly one edge of the drawing. The pseudolinear crossing number of a graph G is the minimum number of pairwise crossings of edges in a pseudolinear drawing of G. We establish several facts on the pseudolinear crossing number, including its computational complexity and its relationship to the usual crossing number and to the rectilinear crossing number. This investigation was motivated by open questions and issues raised by Marcus Schaefer in his comprehensive survey of the many variants of the crossing number of a graph.     

可定向曲面上两个地图的交叉数

In this paper, we discuss the crossing numbers of two one-vertex maps on orientable surfaces. By using a reductive method, we give the crossing number of two one-vertex maps with one face on an orientable surface and the crossing number of a one-vertex map with one face and a one-vertex map with two faces on an orientable surface. This provides a lower bound for the crossing number of two general maps on an orientable surface.